This is my first question on this forum so I will try keep it clear.
I have 1 table
entity with the following data:
ATTR1 ATTR2 ATTR3 ATTR4 A Level 1 null 35 B Level 2 A 34 C Level 2 A 33 D Level 3 B 32 E Level 3 B 31 F Level 3 C 30 G Level 3 C 29 H Level 4 D 28 I Level 4 D 27 J Level 4 E 26 K Level 4 E 25 L Level 4 F 24 M Level 4 F 23 N Level 4 G 22 O Level 4 G 21 P Level 5 H 20 Q Level 5 H 19 R Level 5 H 18 S Level 5 O 17
ATTR1 is the name of the node. It is also the primary key.
ATTR2 is the level of the node.
ATTR3 is the name of the node's parent node.
A is the root and it has no parent nodes, therefore
ATTR4 is the cost of the node.
Now the question:
- Given any part X and a leaf node Y (i.e. Y is a descendent of X), what is the most expensive path from either root to X or direct descendent of X to Y ?
In other words, let us say the X node is
D and the Y node is
P. The path from node to root would be
D-B-A whereas the path from leaf to node would be
How is one to calculate the total cost of each path AND be able to say which is more expensive?
My approach was to do 2 recursive queries, 1 query for each path to find the SUM of each. The problem was that I was forced to create 2 tables and try to put all their data in 1. I feel I have hit a dead end and it is starting to look kinda long and not feasible.
Any help is appreciated, preferably in PostgreSQL syntax.